Associated Weber integral transforms of arbitrary orders (Q1826064)

The author develops inversion formulas for a generalization of the so- called Weber-Orr transform defined by the formula \(\hat f(\xi)=\int^{\infty}_{a}\rho R_{\mu,\nu}(\xi,\rho,a)f(\rho)d\rho\) where \(R_{\mu,\nu}\) denotes the cross product of Bessel functions \(R_{\mu,\nu}(\xi,\rho,a)=J_{\mu}(\xi \rho)Y_{\nu}(\xi a)- J_{\nu}(\xi a)Y_{\quad \mu}(\xi \rho).\) Inversion formulas which in general involve the Erdelyi-Kober operators and are too complicated to be quoted here are constructed for the cases \((i)\quad \mu =\nu -k,\quad k=1,2,3,...,\quad \nu >-1/2\) and \((ii)\quad \mu =\nu +\alpha\) where \(0<\alpha <\nu +3/2,\quad \alpha \neq n+3/4-\nu /2,\) n a positive integer or zero.